On almost smooth functions and piecewise smooth functions

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This note is devoted to Lagrange interpolation for continuous piecewise smooth functions. A new family of interpolatory functions with explicit approximation error bounds is obtained. We apply the theory to the classical Lagrange interpolation.

In this paper we address some of the most fundamental questions regarding the differentiability structure of locally Lipschitz functions defined on separable Banach spaces. For example, we examine the relationship between integrability, D-representability, and strict differentiability. In addition t

Under the Euclidean metric in 3-space, the bisectors of three points intersect in at most one connected componentnamely, a line. In contrast to this, we show that, under non-smooth convex distance functions, there is no general upper bound to the number of connected components of the intersection of